`A(-3, 0), B(10, -2) and C(12, 3)` are the vertices of `triangleABC`. Find the equation of the altitude through A and B.

A(10,4),B(-4,9) and C(-2,-1) are the vertices of a triangle.Find the equations of the altitude through B

A(-3, 1), B(4,4) and C(1, -2) are the vertices of a triangle ABC. Find: the equation of altitude AE.

A (1, -5), B (2, 2) and C (-2, 4) are the vertices of triangle ABC. find the equation of: the altitude of the triangle through B.

A(-3,0),B(1,3),C(2,-1) are the vertices of triangleABC . Then the equation of the altitude from A to BC is :

If A(4, 3), B(0, 0) and C(2, 3) are the vertices of a triangle ABC , find the equation of the bisector of angle A .

Let A(1, 2, 3), B(0, 0, 1) and C(-1, 1, 1) are the vertices of triangleABC . The equation of altitude through B to side AC is

Let A(1, 2, 3), B(0, 0, 1) and C(-1, 1, 1) are the vertices of triangleABC . Q. The equation of altitude through B to side AC is

A(1,4),B(2,3) and C(1,6) are vertices triangleABC . Find the eqaution of the altitude through B and hence find the co-ordinates of the point where this altitude cuts the side AC of triangleABC